Newton’s interpolation is a classical polynomial interpolation approach and plays a significant role in numerical analysis and image processing. The interpolation function of most classical approaches is unique to the given data. In this paper, univariate and bivariate parameterized Newton-type polynomial interpolation methods are introduced. In order to express the divided differences tables neatly, the multiplicity of the points can be adjusted by introducing new parameters. Our new polynomial interpolation can be constructed only based on divided differences with one or multiple parameters which satisfy the interpolation conditions. We discuss the interpolation algorithm, theorem, dual interpolation, and information matrix algorithm. Sin...
In this paper we establish the unisolvence of any interlacing pair of rectangular grids of points wi...
The problem of constructing such a continuous function is called data fitting. Many times, data give...
Interpolation is the process of defining a function that takes on specified values at specified poin...
A new basis of interpolation points for the special case of the Newton two variable polynomial inter...
Abstract: Since the works of Newton and Lagrange, interpolation had been a mature technique in the n...
SIGLETIB Hannover: RN 3109(218) / FIZ - Fachinformationszzentrum Karlsruhe / TIB - Technische Inform...
We present parallel algorithms for the computation and evaluation of interpolating polynomials. The ...
ABSTRACT. Polynomial interpolation approximation has a considerably impor-tant role in the study of ...
Two-variable interpolation by polynomials is investigated for the given f : R2 ! R. The new idea is ...
This paper deals with the polynomial interpolation of degree at most n passing through n 1 distinct ...
In this paper we present a new kind of algorithm, for finding a solution (g0 (x), g1 (x), . . . , gn...
AbstractEight different algorithms for polynomial interpolation are compared with respect to stabili...
Abstract. We consider the problem of interpolating sparse multivariate polynomials from their values...
AbstractMultivariate Birkhoff interpolation is the most complex polynomial interpolation problem and...
Gr\uf6bner bases are used in experimental design and interpolation. They provide a special way to wr...
In this paper we establish the unisolvence of any interlacing pair of rectangular grids of points wi...
The problem of constructing such a continuous function is called data fitting. Many times, data give...
Interpolation is the process of defining a function that takes on specified values at specified poin...
A new basis of interpolation points for the special case of the Newton two variable polynomial inter...
Abstract: Since the works of Newton and Lagrange, interpolation had been a mature technique in the n...
SIGLETIB Hannover: RN 3109(218) / FIZ - Fachinformationszzentrum Karlsruhe / TIB - Technische Inform...
We present parallel algorithms for the computation and evaluation of interpolating polynomials. The ...
ABSTRACT. Polynomial interpolation approximation has a considerably impor-tant role in the study of ...
Two-variable interpolation by polynomials is investigated for the given f : R2 ! R. The new idea is ...
This paper deals with the polynomial interpolation of degree at most n passing through n 1 distinct ...
In this paper we present a new kind of algorithm, for finding a solution (g0 (x), g1 (x), . . . , gn...
AbstractEight different algorithms for polynomial interpolation are compared with respect to stabili...
Abstract. We consider the problem of interpolating sparse multivariate polynomials from their values...
AbstractMultivariate Birkhoff interpolation is the most complex polynomial interpolation problem and...
Gr\uf6bner bases are used in experimental design and interpolation. They provide a special way to wr...
In this paper we establish the unisolvence of any interlacing pair of rectangular grids of points wi...
The problem of constructing such a continuous function is called data fitting. Many times, data give...
Interpolation is the process of defining a function that takes on specified values at specified poin...